Method for modifying a bit sequence in an ARQ retransmission, receiver and transmitter therefor

ABSTRACT

An ARQ transmission method in a communication system, wherein data packets comprising modulation symbols are transmitted based on an automatic repeat request and subsequently combined with previously received data packets. The symbols of the transmitted data packets are modulated In a mapping entity employing at least a first and second signal constellation. The method further comprises the step of obtaining the second signal constellation from the first signal constellation by exchanging a logical bit position and/or inverting a logical bit. The invention further relates to a corresponding transmitter and receiver.

This is a continuation of application Ser. No. 10/295,899 filed Nov. 18, 2002 now U.S. Pat. No. 6,769,085.

FIELD OF THE INVENTION

The present invention relates to a method for modifying a bit sequence in an ARQ retransmission in a communication system. Further, the invention concerns a corresponding receiver and transmitter.

BACKGROUND ART

A common technique in communication systems with unreliable and time-varying channel conditions is to correct errors based on automatic repeat request (ARQ) schemes together with a forward error correction (FEC) technique called hybrid ARQ (HARQ). If an error is detected by a commonly used cyclic redundancy check (CRC), the receiver of the communication system requests the transmitter to resend the erroneously received data packets.

S. Kallel, Analysis of a type II hybrid ARQ scheme with code combining, IEEE Transactions on Communications, Vol. 38, No. 8, August 1990 and S. Kallel, R. Link, S. Bakhtiyari, Throughput performance of Memory ARQ schemes, IEEE Transactions on Vehicular Technology, Vol. 48, No. 3, May 1999 define three different types of ARQ schemes:

-   Type I: The erroneous received packets are discarded and a new copy     of the same packet is retransmitted and decoded separately. There is     no combining of earlier and later received versions of that packet. -   Type II: The erroneous received packets are not discarded, but are     combined with additional retransmissions for subsequent decoding.     Retransmitted packets sometimes have higher coding rates (coding     gain) and are combined at the receiver with the stored     soft-information from previous transmissions. -   Type III Is the same as Type II with the constraint each     retransmitted packet is now self-decodable. This implies that the     transmitted packet is decodable without the combination with     previous packets. This is useful if some packets are damaged in such     a way that almost no information is reusable. If all transmissions     carry identified data, this can be seen as a special case called     HARQ Type III with a single redundancy version.

Types II and III schemes are obviously more intelligent and show a performance gain with respect to Type I, because they provide the ability to reuse information from of previously received erroneous packets. There exist basically three schemes of reusing the redundancy of previously transmitted packets:

-   Soft-Combining -   Code-Combining -   Combination of Soft- and Code-Combining     Soft-Combining

Employing soft-combining the retransmission packets carry identical information compared with the previously received information. In this case the multiple received packets are combined either by a symbol-by-symbol or by a bit-by-bit basis as for example disclosed in D. Chase, Code combining: A maximum-likelihood decoding approach for combining an arbitrary number of noisy packets, IEEE Trans. Commun., Vol. COM-33, pp. 385–393, May 1985 or B. A. Harvey and S. Wicker, Packet Combining Systems based on the Viterbi Decoder, IEEE Transactions on Communications, Vol. 42, No. 2/3/4, April 1994. By combining this soft-decision values from all received packets the reliabilities of the transmitted bits will increase linearly with the number and power of received packets. From a decoder point of view the same FEC scheme (with constant code rate) will be employed over all transmissions. Hence, the decoder does not need to know how many retransmissions have been performed, since it sees only the combined soft-decision values. In this scheme all transmitted packets will have to carry the same number of symbols.

Code-Combining

Code-combining concatenates the received packets in order to generate a new code word (decreasing code rate with increasing number of transmission). Hence, the decoder has to be aware of the FEC scheme to apply at each retransmission instant. Code-combining offers a higher flexibility with respect to soft-combining, since the length of the retransmitted packets can be altered to adapt to channel conditions. However, this requires more signaling data to be transmitted with respect to soft-combining.

Combination of Soft- and Code-Combining

In case the retransmitted packets carry some symbols identical to previously transmitted symbols and some code-symbols different from these, the identical code-symbols are combined using soft-combing as described in the section titled “Soft Combining” while the remaining code-symbols will be combined using code-combining. Here, the signaling requirements will be similar to code-combining.

As it has been shown in M. P. Schmitt Hybrid ARQ Scheme employing TCM and Packet Combining, Electronics Letters Vol. 34, No. 18, September 1998 that HARQ performance for Trellis Coded Modulation (TCM) can be enhanced by rearranging the symbol constellation for the retransmissions. There, the performance gain results from the maximizing the Euclidean distances between the mapped symbols over the retransmissions, because the rearrangement has been performed on a symbol basis.

Considering high-order modulation schemes (with modulation symbols carrying more than two bits) the combining methods employing soft-combining have a major drawback: The bit reliabilities within soft-combined symbols will be in a constant ratio over all retransmissions, i.e. bits which have been less reliable from previous received transmissions will still be less reliable after having received further transmissions and, analogous, bits which have been more reliable from previous received transmissions will still be more reliable after having received further transmissions.

The varying bit reliabilities evolve from the constraint of two-dimensional signal constellation mapping, where modulation schemes carrying more than 2 bits per symbol cannot have the same mean reliabilities for all bits under the assumption that all symbols are transmitted equally likely. The term mean reliabilities is consequently meant as the reliability of a particular bit over all symbols of a signal constellation.

Employing a signal constellation for a 16 QAM modulation scheme according to FIG. 1 showing a Gray encoded signal constellation with a: given bit-mapping order i₁q₁i₂q₂, the bits mapped onto the symbols differ from each other in mean reliability in the first transmission of the packet. In more detail, bits i₁ and q₁ have a high mean reliability, as these bits are mapped to half spaces of the signal constellation diagram with the consequences that their reliability is independent from the fact of whether the bit transmits a one or a zero.

In contrast thereto, bits i₂ and q₂ have a low mean reliability, as their reliability depends on the fact of whether they transmit a one or a zero. For example, for bit i₂, ones are mapped to outer columns, whereas zeros are mapped to inner columns. Similarly, for bit q₂, ones are mapped to outer rows, whereas zeros are mapped to inner rows.

For the second and each further retransmissions the bit reliabilities will stay in a constant ratio to each other, which is defined by the signal constellation employed in the first transmission, i.e. bits i₁ and q₁ will always have a higher mean reliability than bits i₂ and q₂ after any number of retransmissions.

In, co-pending PCT/EP01/01982 a method has been suggested that in order to enhance the decoder performance, it would be quite beneficial to have equal or near to equal mean bit reliabilities after each received transmission of a packet. Hence, the bit reliabilities are tailored over the retransmissions in a way that the mean bit reliabilities get averaged out. This is achieved by choosing a predetermined first and at least second signal constellation for the transmissions, such that the combined mean bit reliabilities for the respective bits of all transmissions are nearly equal.

Hence, the signal constellation rearrangement results in a changed bit mapping, wherein the Euclidean distances between the modulation symbols can be altered from retransmission to retransmission due to the movement of the constellation points. As a result, the mean bit reliabilities can be manipulated in a desired manner and averaged out to increase the performance the FEC decoder at the receiver.

In the solution proposed above, the benefits of the constellation rearrangement are realized through a parameterized bit-to-symbol mapping entity. For complexity or efficient implementational reasons, it may be advantageous for a communication system to have a non-parameterized standard mapping entity.

SUMMARY OF THE INVENTION

Consequently, the object of the present invention resides in providing an ARQ transmission method, a transmitter and a receiver with an improved error correction performance without a parameterized bit-to-symbol mapping entity.

This object is solved by a method comprising the steps as defined in claim 1. Further, the object is solved by a transmitter and receiver as defined by the independent claims.

The idea underlying the present invention is to modify the input bit sequence prior to entry of same into the mapping entity. This modification of the signal constellation can be achieved by using an interleaver and a logical bit inverter, which invert and/or exchange the positions of the signal constellation bits dependent on the retransmission number parameter m. Hence, the beneficial effects of a constellation rearrangement are achieved without the need for a parameterized bit to symbol mapping entity. As a result, the sequence which is output after processing by the interleaver the logical bit inverter and a non-parameterized standard mapping entity is indistinguishable from the output of a parameterized bit to symbol mapping entity employing various constellation rearrangement schemes.

BRIEF DESCRIPTION OF THE DRAWINGS

For a better understanding of the invention, preferred embodiments will be described in the following with reference to the accompanying drawings.

FIG. 1 is an exemplary signal constellation for illustrating a 16 QAM modulation scheme with Gray encoded bit symbols,

FIG. 2 shows four examples for signal constellations for a 16 QAM modulation scheme with Gray encoded bit symbols, and

FIG. 3 is an exemplary embodiment of a communication system in which the method underlying the invention is employed.

DETAILED DESCRIPTION OF EMBODIMENTS

In the following the concept of a Log-Likelihood-Ratio (LLR) will be described as a metric for the bit reliabilities. First the straight forward calculation of the bit LLRs within the mapped symbols for a single transmission will be shown. Then the LLR calculation will be extended to the multiple transmission case.

Single Transmission

The mean LLR of the i-th bit b_(n) ^(i) under the constraint that symbol s_(n) has been transmitted for a transmission over a channel with additive white gaussian noise (AWGN) and equally likely symbols yields

$\begin{matrix} {{{{LLR}_{b_{n}^{i}|r_{n}}\left( r_{n} \right)} = {{\log\left\lbrack {\sum\limits_{({{m|b_{m}^{i}} = b_{n}^{i}})}{\mathbb{e}}^{{- \frac{E_{S}}{N_{0}}} \cdot d_{n,m}^{2}}} \right\rbrack} - {\log\left\lbrack {\sum\limits_{({m|{b_{m}^{i} \neq b_{n}^{i}}})}{\mathbb{e}}^{{- \frac{E_{S}}{N_{0}}} \cdot d_{n,m}^{2}}} \right\rbrack}}},} & (1) \end{matrix}$ where r_(n)=s_(m), denotes the mean received symbol under the constraint the symbol s_(n) has been transmitted (AWGN case), d_(n,m) ² denotes the square of the Euclidean distance between the received symbol r_(n) and the symbol s_(m), and E_(S)/N₀ denotes the observed signal-to-noise ratio.

It can be seen from Equation (1) that the LLR depends on the signal-to-noise ratio E_(S)/N₀ and the Euclidean distances d_(n,m) between the signal constellation points.

Multiple Transmissions

Considering multiple transmissions the mean LLR after the k-th transmission of the i-th bit b_(n) ^(i) under the constraint that symbols S_(n) ^((j)) have been transmitted over independent AWGN channels and equally likely symbols yields

$\begin{matrix} {{{{LLR}_{b_{n}^{i}|{\bigcap_{j = 1}^{k}r_{n}^{(j)}}}\left( {r_{n}^{(1)},r_{n}^{(2)},\;\ldots\mspace{11mu},r_{n}^{(k)}} \right)} = {{\log\left\lbrack {\sum\limits_{({{m|b_{m}^{i}} = b_{n}^{i}})}{\mathbb{e}}^{- {\sum\limits_{j = 1}^{k}\;{{(\frac{E_{S}}{N_{0}})}^{(j)} \cdot {(d_{n,m}^{(j)})}^{2}}}}} \right\rbrack} - {\log\left\lbrack {\sum\limits_{({m|{b_{m}^{i} \neq b_{n}^{i}}})}{\mathbb{e}}^{- {\sum\limits_{j = 1}^{k}\;{{(\frac{E_{S}}{N_{0}})}^{(j)} \cdot {(d_{n,m}^{(j)})}^{2}}}}} \right\rbrack}}},} & (2) \end{matrix}$ where j denotes the j-th transmission ((j−1)-th retransmission). Analogous to the single transmission case the mean LLRs depend on the signal-to-noise ratios and the Euclidean distances at each transmission time.

If no constellation rearrangement is performed the Euclidean distances d_(n,m) ^((j))=d_(n,m) ⁽¹⁾ are constant for all transmissions and, hence, the bit reliabilities (LLRs) after k transmissions will be defined by the observed signal-to-noise ratio at each transmission time and the signal constellation points from the first transmission. For higher level modulation schemes (more than 2 bits per symbol) this results in varying mean LLRs for the bits, which in turn leads to different mean bit reliabilities. The differences in mean reliabilities remain over all retransmissions and lead to a degradation in decoder performance.

In the following, the case of a 16-QAM system will be exemplarily considered resulting in 2 high reliable and 2 low reliable bits, where for the low reliable bits the reliability depends on transmitting a one or a zero (see FIG. 1). Hence, overall there exist 2 levels of mean reliabilities, whereby the second is further subdivided.

Level 1 (High Reliability, 2 bits): Bit mapping for ones (zeros) separated into the positive (negative) real half space for the i-bits and the imaginary half space the q-bits. Here, there is no difference whether the ones are mapped to the positive or to the negative half space.

Level 2 (Low Reliability, 2 bits): Ones (zeros) are mapped to inner (outer) columns for the i-bits or to inner (outer) rows for the q-bits. Since there is a difference for the LLR depending on the mapping to the inner (outer) columns and rows, Level 2 is further classified:

Level 2a: Mapping of i_(n) to inner columns and q_(n) to inner rows respectively.

Level 2b: Inverted mapping of Level 2a: Mapping of i_(n) to outer columns and q_(n) to outer rows respectively.

To ensure an optimal averaging process over the transmissions for all bits the levels of reliabilities have to be altered.

It has to be considered that the bit-mapping order is open prior initial transmission, but has to remain through retransmissions, e.g. pit-mapping for initial transmission: i₁q₁i₂q₂→bit-mapping all retransmissions: i₁q₁i₂q₂.

Some examples for possible constellations are shown in FIG. 2. The resulting bit reliabilities according to FIG. 2 are given in Table 1.

TABLE 1 Constellation bit i₁ bit q₁ bit i₂ bit q₂ 1 High High Low Low Reliability Reliability Reliability Reliability (Level 1)  (Level 1)  (Level 2b) (Level 2b) 2 Low Low High High Reliability Reliability Reliability Reliability (Level 2a) (Level 2a) (Level 1)  (Level 1)  3 Low Low High High Reliability Reliability Reliability Reliability (Level 2b) (Level 2b) (Level 1)  (Level 1)  4 High High Low Low Reliability Reliability Reliability Reliability (Level 1)  (Level 1)  (Level 2a) (Level 2a)

In the following, it is assumed that m denotes the retransmission number parameter, with m=0 denoting the first transmission of a packet in the ARQ context. Further let b denote the number of bits that form a symbol in the mapping entity. Typically, b can be any integer number, where the most often used values for communication systems are an integer power of 2.

Without loss of generality it can be further assumed that the number of bits n that are used as input to the interleaving process is dividable by b, i.e. is an integer multiple of b. Those skilled in the art will perceive that if this should not be the case, then the sequence of input bits can be easily appended by dummy bits until the above condition is met.

As described above, for a given modulation, several reliability levels can be identified. The interleaving process should thus average out the reliabilities of the b bits over the retransmissions such that all b bits are in average equally reliable. This means that the interleaver has to change the positions of the b bits within a symbol (also termed “wrapping” in the art) such that each of the original bits is mapped as often to all reliability levels as every other of the b bits. This means that the interleaving is an intra-symbol bit interleaving process.

Additionally, there can be several bit positions for which the reliabilities depend on the logical bit value (low or high). When a bit is mapped for the non-first time on such a position, this bit should also be logically inverted.

With these rules, patterns can be constructed which determine the interleaver and inverter process for a transmission number m.

In theory, the perfect averaging out of the reliabilities might be possible only after an infinite or very high number of retransmissions. In these cases, there might thus be several alternatives which differ in the sequence of interleaver or inverter patterns. Which of these alternatives is chosen is left open to the choice of the system designer, since it will mean no difference in performance.

If the signal constellation as in FIG. 1 is to be kept, in order to get constellation 2 from constellation 1 in FIG. 2, the following processes have to be executed, where the order is irrelevant:

-   -   exchange positions of original bits i₁ and i₂     -   exchange positions of original bits q₁ and q₂     -   logical bit inversion of original bits i₁ and q₁

Alternatively, those bits that end in positions 1 and 2 can also be inverted.

An example dependent on the transmission number is given in the following table, where the bits always refer to the first transmission, and a long dash above a character denotes logical bit inversion of that bit:

TABLE 2 Constellation number Interleaver and Inverter functionality 1 i₁q₁i₂q₂ 2 i₂q₂ī₁ q ₁ or ī₂ q ₂ī₁ q ₁ 3 ī₂ q ₂i₁q₁ or i₂q₂i₁q₁ 4 i₁q₁ī₂ q ₂ or ī₁ q ₁ī₂ q ₂

The first given examples in each row of table 2 correspond to the constellations given in FIG. 2. As readily apparent from table 2, signal constellation 2 is obtained from constellation 1 by exchanging (swapping) the positions of bits i₁ and i₂ as well as that of bits q₁ and q₂ and by inverting either bit pair i₁, q₁ or all bits. Similarly, signal constellation 3 is obtained from constellation 1 by exchanging positions of bits i₁ and i₂ as well as that of bits q, and q₂ with each other respectively and by inverting bit pair i₂, q₂ in one alternative. In the other alternative, only the bit positions are exchanged and no inversion is necessary. Finally, signal constellation 4 is obtained from constellation 1 by inverting either bit pair i₂, q₂ or all bits of the symbol without exchanging any bit position.

From this, it can be chosen between different strategies for transmission numbers (non-exhaustive):

TABLE 3 Transmission Constellation Constellation Constellation Constellation Constellation Constellation Number Number Number Number Number Number Number 1 1 1 1 1 1 1 2 2 2 3 4 4 3 3 3 4 2 2 3 4 4 4 3 4 3 2 2

FIG. 3 shows an exemplary embodiment of a communication system in which the method underlying the invention is employed.

At the transmitter 100, a bit sequence is obtained from a forward error correction (FEC) encoder (not shown) and subsequently input into an interleaver 110 and a logical bit inverter 120. The interleaver 110 and logical bit inverter are each dependent on the retransmission number parameter m and modify the input bit sequence. Subsequently, the bit sequence is input into the mapper/modulator 130 being a non-parameterized standard mapping entity. The mapper typically uses one of the signal constellations shown in FIG. 2 and maps the b bits onto a symbol which is transmitted over the communication channel 200. The communication channel is typically a radio communication channel experiencing unreliable and time-varying channel conditions.

The interleaving/inverting patterns is either stored at both, the transmitter and the receiver or stored at the transmitter and signalled to the receiver.

At the receiver 300, the complex symbols are first input into a demapper/demodulator 330 which demodulates the received symbols into a corresponding bit domain sequence (e.g. sequence of LLRs). This sequence is then input into a logical inverter 320 and subsequently into a de-interleaver 310 from which the obtained bit domain sequence is output.

The interleaver and de-interleaver operate in accordance with the well known technique of interleaving/deinterleaving by applying a determined, pseudo-random or random permutation of the input bit or symbol sequences, i.e. exchange (swap) the positions of the bits or symbols within a sequence. In the above described embodiment, the interleaver is a intra-symbol bit interleaver which changes the position of the bits that form a symbol in the mapping entity.

The logical bit inverter operates in accordance with a well known technique of inverting the logical value of a bit, i.e. turns a logical low to a logical high value and vice versa. In a practical realization for a receiver working with log likelihood ratios, this inverting operation is equivalent to a sign inversion of the log likelihood ratio.

If a retransmission is launched by an automatic repeat request issued by an error detector (not shown) with the result that an identical data packet is transmitted from the transmitter 100, in the de-mapper/demodulator 330, the previously received erroneous data packets are soft-combined with the retransmitted data packets. Due to the modification of the bit sequence by the interleaver and the logical bit inverter, the mean bit reliabilities are averaged out resulting in an increased performance in the receiver.

Although the method described above has been described using Gray-encoded signals and a QAM modulation scheme, it is clear to a skilled person that other suitable encoding and modulation schemes can be equally used in obtaining the benefits of the invention. 

1. A transmission apparatus for transmitting data using a HARQ process, said apparatus comprising: a rearranging section that performs a rearrangement, with respect to a bit sequence (i₁q₁i₂q₂), by swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁, to produce a rearranged bit sequence; a mapping section that maps the rearranged bit sequence to 16 QAM by a modulation mapper; and a transmitting section that transmits data as the rearranged bit sequence and that transmits information about said rearrangement.
 2. The transmission apparatus according to claim 1, wherein said mapping section further maps the bit sequence (i₁q₁i₂q₂) to 16 QAM by the modulation mapper, and said transmitting section (i) transmits first data as the bit sequence (i₁q₁i₂q₂) and (ii) transmits second data as the rearranged bit sequence.
 3. The transmission apparatus according to claim 1, wherein said rearranging section further operates, with respect to the bit sequence (i₁q₁i₂q₂), to at least one of (i) swap i₁ and q₁with i₂ and q₂, (ii) swap i₁ and q₁ with i₂ and q₂ and invert logical values of i₂ and q₂, and (iii) invert logical values of i₂ and q₂.
 4. The transmission apparatus according to claim 1, wherein said rearranging section operates on the bit sequence (i₁q₁i₂q₂) such that a bit reliability for each bit of the bit sequence is averaged out through the HARQ process.
 5. A reception apparatus comprising: a receiving section that receives data and said information transmitted by the transmission apparatus according to claim
 1. 6. A transmission system comprising: a transmission apparatus according to claim 1, and a reception apparatus comprising a receiving section that receives data and said information transmitted by said transmission apparatus.
 7. A transmission apparatus for transmitting data using a HARQ process, said apparatus comprising: a transmitting section that (i) transmits first data as a bit sequence (i₁q₁i₂q₂) , and (ii) transmits second data as a rearranged bit sequence, wherein: the rearranged bit sequence is produced, prior to mapping to 16 QAM by a modulation mapper, by, with respect to the bit sequence (i₁q₁i₂q₂), swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁, and said transmitting section transmits information about said swapping and said inverting.
 8. The transmission apparatus according to claim 7, wherein the rearranged bit sequence is produced, prior to mapping to 16 QAM, by further operating, with respect to the bit sequence (i₁q₁i₂q₂), to at least one of (i) swap i₁ and q₁ with i₂ and q₂ (ii) swap i₁ and q₁ with i₂ and q₂ and invert logical values of i₂ and q₂, and (iii) invert logical values of i₂ and q₂.
 9. A transmission method for transmitting data using a HARQ process, said method comprising: with respect to a bit sequence (i₁q₁i₂q₂), performing a rearrangement by swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁, to produce a rearranged bit sequence; mapping the rearranged bit sequence to 16 QAM by a modulation mapper; and transmitting data as the rearranged bit sequence and information about said rearrangement.
 10. The transmission method according to claim 9, wherein said method further comprises: mapping the bit sequence (i₁q₁i₂q₂) to 16 QAM by the modulation mapper; and transmitting first data as the bit sequence, wherein second data is transmitted as the rearranged bit sequence.
 11. A reception method comprising: receiving data and said information transmitted by the transmission method according to claim
 9. 12. A transmission method for transmitting data using a HARQ process, said method comprising: transmitting first data as a bit sequence (i₁q₁i₂q₂); and transmitting second data as a rearranged bit sequence, wherein: the rearranged bit sequence is produced, prior to mapping to 16 QAM by a modulation mapper, by, with respect to the bit sequence (i₁q₁i₂q₂), swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁, and information about said swapping and said inverting is transmitted.
 13. A reception apparatus for receiving data transmitted using a HARQ process, comprising: a receiving section that receives data transmitted as a rearranged bit sequence; and a demodulating section that demodulates the received data, wherein: the rearranged bit sequence is produced by, with respect to a bit sequence (i₁q₁i₂q₂), swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁ , and said receiving section receives information about said swapping and said inverting.
 14. The reception apparatus according to claim 13, further comprising a rearranging section that rearranges the rearranged bit sequence of the received data based on said information.
 15. The reception apparatus according to claim 13, further comprising a rearranging section that, with respect to the rearranged bit sequence (i₁q₁i₂q₂) , swaps i₁ and q₁ with i₂ and q₂ and inverts logical values of i₂ and q₂ based on said information.
 16. The reception apparatus according to claim 13, further comprising a combining section that combines the received data with previously received data.
 17. The reception apparatus according to claim 13, wherein said receiving section is further operable to receive data transmitted as the bit sequence (i₁q₁i₂q₂) and said reception apparatus further comprises a combining section that combines data transmitted as the rearranged bit sequence with data transmitted as the bit sequence (i₁q₁i₂q₂).
 18. A reception method for receiving data transmitted using a HARQ process, said method comprising: receiving data transmitted as a rearranged bit sequence; and demodulating the received data, wherein: the rearranged bit sequence is produced by, with respect to a bit sequence (i₁q₁i₂q₂), swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₁ and q₁, and information about said swapping and said inverting is received.
 19. The reception method according to claim 18, further comprising rearranging the rearranged bit sequence of the received data based on said information.
 20. The reception method according to claim 18, further comprising: with respect to the rearranged bit sequence (i₁q₁i₂q₂), swapping i₁ and q₁ with i₂ and q₂ and inverting logical values of i₂ and q₂ based on said information.
 21. The reception method according to claim 18, further comprising combining the received data with previously received data.
 22. The reception method according to claim 21,further comprising: receiving data transmitted as the bit sequence (i₁q₁i₂q₂); and combining data transmitted as the rearranged bit sequence with data transmitted as the bit sequence (i₁q₁i₂q₂). 